@FOOTNOTE{Note1,key="Note1",note="When $r^{\prime }$ is close enough to $r$, this selection of base points is always valid except for the pairs with zero relative phase, which consist a set with Lebesgue measure zero on $\protect \text  {mGBZ}(E)$."}
@FOOTNOTE{Note2,key="Note2",note="Here, ``small enough'' means that the special winding loop picked in Fig. \ref {fig:strip-winding}(c) can be continuously transported from $X(E,r)$ to $X(E,r^{\prime })$ while $r$ increases to $r^{\prime }$."}
@FOOTNOTE{Note3,key="Note3",note="Here, the sign ``$\approx $'' means that the side lengths are selected as the one with the given aspect and nearest total number to the given total number if the aspect and the total number are not satisfied simultaneously. For example, for the case of $N_{\protect \text  {tot}}\approx 12800$ and $L_{x}:L_{y}=1:1$, the size is $L_{x}=L_{y}=113$, which is the closest number to $\protect \sqrt  {12800}$."}
@CONTROL{REVTEX42Control}
@CONTROL{apsrev42Control,author="08",editor="1",pages="0",title="0",year="1"}
